Kidney Exchange - Theoretical Developments and Practical Challenges

1. Kidney Exchange - Theoretical Developments and Practical Challenges Itai Ashlagi Algorithmic Economics Summer Schools, CMU

2. Kidney Exchange Background • There are more than 90,000 patients on the waiting list for cadaver kidneys in the U.S. (Yesterday there were 92,786.) • In 2011 33,581 patients were added to the waiting list, and 27,066 patients were removed from the list. • In 2009 there were 11,043 transplants of cadaver kidneys performed in the U.S and more than 5,771 from living donors. • In the same year, 4,697 patients died while on the waiting list. 2,466 others were removed from the list as “Too Sick to Transplant”. • Sometimes donors are incompatible with their intended recipients. • This opens the possibility of exchange

3. Kidney Exchange Two pair (2-way) kidney exchange Donor 1 Blood type A Recipient 1 Blood type B Donor 2 Blood type B Recipient 2 Blood type A 3-way exchanges (and larger) have been conducted

4. Paired kidney donations Donor Recipient Pair 1 Donor Recipient Donor Recipient Pair 3 Pair 2

5. Non-directed donors: cycles plus chains Pair 1 Pair 4 Pair 3 Pair 5 Non-directed donor Pair 6 Pair 2 Pair 7

6. Kidney exchange clearinghouse design Roth, Alvin E., Tayfun Sönmez, and M. Utku Ünver, “Kidney Exchange,”Quarterly Journal of Economics, 119, 2, May, 2004, 457-488. ____ “Pairwise Kidney Exchange,”Journal of Economic Theory, 125, 2, 2005, 151-188. ___ “A Kidney Exchange Clearinghouse in New England,” American Economic Review, Papers and Proceedings, 95,2, May, 2005, 376-380. _____ “Efficient Kidney Exchange: Coincidence of Wants in Markets with Compatibility-Based Preferences,”American Economic Review, June 2007, 97, 3, June 2007, 828-851 ___multi-hospital exchanges become common—hospitals become players in a new “kidney game”________ Ashlagi, Itai and Alvin E. Roth ”Individual rationality and participation in large scale, multi-hospital kidney exchange,” revised June 2012. Ashlagi, Itai, David Gamarnik and Alvin E. Roth, The Need for (long) Chains in Kidney Exchange, May 2012

7. And in the medical literature Saidman, Susan L., Alvin E. Roth, Tayfun Sönmez, M. Utku Ünver, and Francis L. Delmonico, “Increasing the Opportunity of Live Kidney Donation By Matching for Two and Three Way Exchanges,”Transplantation, 81, 5, March 15, 2006, 773-782. Roth, Alvin E., Tayfun Sönmez, M. Utku Ünver, Francis L. Delmonico, and Susan L. Saidman, “Utilizing List Exchange and Undirected Donation through “Chain” Paired Kidney Donations,”American Journal of Transplantation, 6, 11, November 2006, 2694-2705. Rees, Michael A., Jonathan E. Kopke, Ronald P. Pelletier, Dorry L. Segev, Matthew E. Rutter, Alfredo J. Fabrega, Jeffrey Rogers, Oleh G. Pankewycz, Janet Hiller, Alvin E. Roth, Tuomas Sandholm, Utku Ünver, and Robert A. Montgomery, “A Non-Simultaneous Extended Altruistic Donor Chain,” New England Journal of Medicine , 360;11, March 12, 2009, 1096-1101. Ashlagi, Itai, Duncan S. Gilchrist, Alvin E. Roth, and Michael A. Rees, “Nonsimultaneous Chains and Dominos in Kidney Paired Donation – Revisited,” American Journal of Transplantation, 11, 5, May 2011, 984-994 Ashlagi, Itai, Duncan S. Gilchrist, Alvin E. Roth, and Michael A. Rees, “NEAD Chains in Transplantation,” American Journal of Transplantation, December 2011; 11: 2780–2781.

8. There’s also a growing CS literature Abraham, D., Blum, A., and Sandholm, T. 2007. Clearing Algorithms for Barter Exchange Markets: Enabling Nationwide Kidney Exchanges. In Proceedings of the ACM Conference on Electronic Commerce (EC). Ashlagi, Itai, Felix Fischer, Ian A. Kash, Ariel D. Procaccia,2010, Mix and Match, EC’10, June 7–11, 2010, Cambridge, MA. Biro, Peter, and Katarina Cechlarova (2007), Inapproximability of the kidney exchange problem, Information Processing Letters, 101, 5, 16 March 2007, 199-202 IoannisCaragiannis, ArisFilos-Ratsikas, and Ariel D. Procaccia. An Improved 2-Agent Kidney Exchange Mechanism, July 2011. Toulis, P., and D. C. Parkes. 2011. “A Random Graph Model of Kidney Exchanges : Optimality and Incentives.” Proc of the 11th ACM Conference on Electronic Commerce, 323– 332 Dickerson, J. P., A. D. Procaccia, and T. Sandholm. 2012. “Optimizing Kidney Exchange with Transplant Chains: Theory and Reality.” Proc of the eleventh international conference on autonomous agents and multiagent systems

9. Centralized Kidney Exchange Alliance Paired Donation (APD), Ohio – 81 hospitals National Kidney Registry, NY - 70 hospitals UNOS - national kidney exchange pilot in Oct 2010: 77 hospitals registered

10. Factors determining transplant opportunity O • Blood compatibility • So type O patients are at a disadvantage in finding compatible kidneys—they can only receive O kidneys. • And type O donors will be in short supply. • Tissue type compatibility. Percentage reactive antibodies (PRA) • Low sensitivity patients (PRA < 79) • High sensitivity patients (80 < PRA < 100) A B AB

12. Random Compatibility Graphs n hospitals, each of a size c>0 D(n) - random compatibility graph: • n pairs/nodes are randomized –compatible pairs are disregarded • Edges (crossmatches) are randomized Random graphs will allow us to ask two related questions: What would efficient matches look like in an “ideal” large world? What is the efficiency loss from requiring the outcome to be individually rational for hospitals?

13. (Large) Random Graphs G(n,p) – n nodes and each two nodes have a non directed edge with probability p Closely related model: G(n,M): n nodes and M edges—the M edges are distributed randomly between the nodes Erdos-Renyi: For any p(n)¸(1+²)(ln n)/n almost every large graph G(n,p(n)) has a perfect matching, i.e. as n!1the probability that a perfect matching exists converges to 1. Similar lemma for a random bipartite graph G(n,n,p). Can extend also for r-partite graphs…

14. Efficient Allocations: what they would look like if we were seeing all the patients in sufficiently large markets Theorem (Ashlagi and Roth, 2011): In almost every large graph (with p above threshhold) there exist an efficient allocation with exchanges of size at most 3. O-AB B-A O-B AB-A AB-B A-B B-AB A-AB A-O B-O O-A AB-O X-X Overdemanded pairs are shaded

15. How about when hospitals become players? • We are seeing some hospitals withhold internal matches, and contribute only hard-to-match pairs to a centralized clearinghouse. • Mike Rees (APD director) writes us: “As you predicted, competing matches at home centers is becoming a real problem.  Unless it is mandated, I'm not sure we will be able to create a national system.  I think we need to model this concept to convince people of the value of playing together”.

16. Hospitals have Incentives a1,a2 are pairs from the same hospital Pairs b and c are from different hospitals a1 a1 b b (high priority) a2 c a2

17. Individual rationality and efficiency: an impossibility theorem with a (discouraging) worst-case bound • For every k> 3, there exists a compatibility graph such that no k-maximum allocation which is also individually rational matches more than 1/(k-1) of the number of nodes matched by a k-efficient allocation.

18. a1 a3 Proof (for k=3) b e c a2 d

19. k=2 Theorem: 1. There is no efficient strategyproof mechanism (Sonmez et al.) 2. Negative: No strategyproof mechanism achieves more than 1/2 of the maximum allocation (w.r.t to k=2) and for randomized the bound is 0.75. Postive: A randomzied mechanism that guarantees 0.5. s(Ashlagi, Fischer, Kash & Procaccia EC 10)

20. Individually Rational Allocations Theorem: If every hospital size is regular and bounded than in almost every large graph the efficiency loss from a maximum individually rational allocation is at most (1+²)®AB-Om + o(m) for any ²>0 (less than 1.5%). So the worst-case impossibility results don’t look at all like what we could expect to achieve in large kidney exchange pools (if individually rational mechanisms are adopted).

21. O-AB B-A O-B AB-A AB-B A-B X-X B-AB A-AB A-O B-O O-A AB-O

22. “Cost” of IR is very small for clinically relevant sizes too - Simulations

23. But the cost of not having IR could be very high if it causes centralized matching to break down

24. But current mechanisms aren’t IR for hospitals • Current mechanisms: Choose (~randomly) an efficient allocation. Proposition: Withholding internal exchanges can (often) be strictly better off (non negligible) for a hospital regardless of the number of hospitals that participate. A-O O-A And hospitals can withhold individual overdemanded pairs

25. IR is not sufficient Suppose we choose a maximum allocation constraining that for each hospital we match at least the number of (underdemanded) pairs it can internally match. Truth-telling is not a (almost) Bayes-Nash equilibrium A-O O-A

26. IR is not sufficient Suppose we choose a maximum allocation constraining that for each hospital we match at least the number of (underdemanded) pairs it can internally match. Truth-telling is not a (almost) Bayes-Nash equilibrium A-O O-A

27. A New Mechanism Thm: An o(1)-Bayes-Nash incentive compatible mechanism assuming each hospital is of a “strong regular” size. The efficiency loss is up to 1%.

28. The underdemanded lottery How to choose the underdemanded pairs that will be matched? a A-O b O-A a1 b2 b1 a3 a2

29. The underdemanded lottery How to choose the underdemanded pairs that will be matched? a A-O b O-A a1 b2 b1 a3 a2

30. The underdemanded lottery How to choose the underdemanded pairs that will be matched? a A-O b a1 b1 O-A a1 b2 b1 a3 a2

31. The underdemanded lottery How to choose the underdemanded pairs that will be matched? a A-O b a1 b1 O-A a1 b2 b1 a3 a2

32. The underdemanded lottery How to choose the underdemanded pairs that will be matched? a A-O b a1 b1 O-A a1 b2 b1 a3 a2

33. The underdemanded lottery How to choose the underdemanded pairs that will be matched? a A-O b a1 b1 O-A a1 b2 b1 a2 a3 a2

34. Other sources of efficiency gains • Non-directed donors ND-D P1 P2-D2 P1-D1 ND-D P3

35. The graph theory representation doesn’t capture the whole story Rare 6-Way Transplant Performed Donors Meet Recipients March 22, 2007 BOSTON -- A rare six-way surgical transplant was a success in Boston. NewsCenter 5's Heather Unruh reported Wednesday that three people donated their kidneys to three people they did not know. The transplants happened one month ago at Massachusetts General Hospital and Beth Israel Deaconess. The donors and the recipients met Wednesday for the first time. Why are there only 6 people in this picture? Simultaneity congestion: 3 transplants + 3 nephrectomies = 6 operating rooms, 6 surgical teams…

36. Non-simultaneous extended altruistic donor chains (reduced risk from a broken link) Since NEAD chains don’t require simultaneity, they can be longer…

37. The First NEAD Chain (Rees, APD) July July Sept Sept Feb Feb Feb Feb March March 2007 2007 2007 2007 2008 2008 2008 2008 2008 2008 MI AZ OH OH OH MD MD MD NC MD OH 1 2 3 4 5 6 7 8 9 10 O O A A B A A A A AB AB O O A A B A A A A A 62 0 23 0 100 78 64 3 100 46 Cauc Cauc Cauc Cauc Cauc Hisp Cauc Cauc Cauc AA # * Recipient PRA Recipient Ethnicity Relationship Husband Wife Mother Daughter Daughter Mother Sister Brother Wife Husband Father Daughter Husband Wife Friend Friend Brother Brother Daughter Mother * This recipient required desensitization to Blood Group (AHG Titer of 1/8). # This recipient required desensitization to HLA DSA by T and B cell flow cytometry.

39. Recent literature about chains Rees et al..., NEJM 2009 – story about first long chain Gentry & Segev, AJT 2010 – long chains are not effective ? Ashlagi, Gilchrist, Rees & Roth, AJT 2011a - long chains are effective Gentry & Segev, AJT 2011a – honeymoon phase is over and long chains are not effective Ashlagi, Gilchrist, Rees & Roth, AJT 2011b - letter: honeymoon is still around for a while Dickerson, Procaccia & Sandholm , AAMAS 2012 - extensive simulation results for when chains are useful. P2-D2 P1-D1 NDD P3

40. Why are NEAD chains so effective? • In a really large market they wouldn’t be…

41. Chains in an efficient large dense pool A-A O-O B-B AB-AB O-AB B-A O-B AB-A AB-B A-B • VA-B B-AB A-AB A-O B-O O-A AB-O It looks like a non-directed donor can increase the match size by at most 3  Non-directed donor—blood type O

42. A disconnect between model and data: • The large graph model with constant p (for each kind of patient-donor pair) predicts that only short chains are useful. • But we now see long chains in practice. • They could be inefficient—i.e. competing with short cycles for the same transplants. • But this isn’t the the case when we examine the data.

43. Why?Very many very highly sensitized patients Previous simulations: sample a patient and donor from the general population, discard if compatible (simple live transplant), keep if incompatible. This yields 13% High PRA. The much higher observed percentage of high PRA patients means compatibility graphs will be sparse

45. Long chains in the clinical data: even a single non-directed donor can start a long chain

46. Graph induced by pairs with A patients and A donors. 38 pairs (30 high PRA). Dashed edges are parts of cycles. No cycle contains only high PRA patients. Only one cycle includes a high PRA patient

47. Jellyfish structure of the compatibility graph: highly connected low sensitized pairs, sparse hi-sensitized pairs

48. So we need to model sparse graphs… • We’ll consider random graphs with two kinds of nodes (patient-donor pairs): Low sensitized and high sensitized • L nodes will have a constant probability of an incoming edge (compatible kidney) • H nodes will have a probability that decreases with the size of the graph (e.g. in a simple case we’ll keep the number of compatible kidneys constant, pH = c/n) • In the H subgraph, we’ll observe trees but almost no short cycles • A non-directed donor can be modeled as a donor with a patient to whom anyone can donate—this allows non-directed donor chains to be analyzed as cycles • (We also consider the effect of different assumptions about how the number of non-directed donors grows…)

49. Cycles and paths in random dense-sparse graphs • n nodes. Each node is Low w.p. À·1/2 and High w.p. 1-À • incoming edges to L are drawn w.p. • incoming edges to L are drawn w.p. L H

50. Cycles and paths in random sparse (sub)graphs (v=0, only highly sensitized patients) • Theorem • The number of cycles of length O(1) is O(1). • But when pH is a large constant there is cycle with length O(n) Proof (a): H To be logistically feasible, a long cycle must be a chain, i.e. contain a NDD